English

Affine Volterra processes

Probability 2019-10-23 v3

Abstract

We introduce affine Volterra processes, defined as solutions of certain stochastic convolution equations with affine coefficients. Classical affine diffusions constitute a special case, but affine Volterra processes are neither semimartingales, nor Markov processes in general. We provide explicit exponential-affine representations of the Fourier-Laplace functional in terms of the solution of an associated system of deterministic integral equations of convolution type, extending well-known formulas for classical affine diffusions. For specific state spaces, we prove existence, uniqueness, and invariance properties of solutions of the corresponding stochastic convolution equations. Our arguments avoid infinite-dimensional stochastic analysis as well as stochastic integration with respect to non-semimartingales, relying instead on tools from the theory of finite-dimensional deterministic convolution equations. Our findings generalize and clarify recent results in the literature on rough volatility models in finance.

Keywords

Cite

@article{arxiv.1708.08796,
  title  = {Affine Volterra processes},
  author = {Eduardo Abi Jaber and Martin Larsson and Sergio Pulido},
  journal= {arXiv preprint arXiv:1708.08796},
  year   = {2019}
}
R2 v1 2026-06-22T21:26:40.302Z